A331240 -id:A331240 - cp's OEIS frontend

A331229 a(n) = number of triangles with integer sides i <= j <= k with radius of circumcircle <= n.

1, 7, 22, 47, 91, 148, 231, 334, 469, 631, 830, 1062, 1339, 1657, 2024, 2434, 2905, 3427, 4014, 4653, 5362, 6141, 6994, 7911, 8917, 10000, 11169, 12425, 13774, 15211, 16743, 18381, 20133, 21975, 23929, 25998, 28185, 30482, 32906, 35449, 38137, 40935, 43884, 46954

Offset: 1

Hugo Pfoertner, Jan 13 2020

nonn

			The radius of the m-th circumcircle in the sorted list is R(m) = sqrt(A331227(m)/A331228(m)). The list of radii, rounded to 10^-4, starts: {0.57735, 1.0328, 1.1547, 1.5119, 1.5213, 1.5910, 1.7321, 2.0125, 2.0158, 2.0656, 2.0656, 2.1574, 2.3094, 2.5000, 2.5126, 2.5516, 2.5621, 2.6207, 2.6318, 2.7136, 2.7277, 2.8868, 3.0067, ...}.
a(1) = 1: 1 circle (R = 0.57735) with R <= 1,
a(2) = 7: a(1) + 6 circles (R = 1.0328, 1.1547, 1.5119, 1.5213, 1.5910, 1.7321) with 1 < R <= 2,
a(3) = 22: a(2) + 15 circles (R = 2.0125, 2.0158, 2.0656, 2.0656, 2.1574, 2.3094, 2.5000, 2.5126, 2.5516, 2.5621, 2.6207, 2.6318, 2.7136, 2.7277, 2.8868) with 2 < R <= 3.

Cf. A331227, A331228.

Bisection of A331240 (n even).

A331242 a(n) = number of triangles with integer sides i <= j <= k with radius of enclosing circle <= n.

Original entry on oeis.org

1, 8, 26, 56, 106, 175, 272, 397, 555, 750

Offset: 1

Hugo Pfoertner, Jan 20 2020

The enclosing circle differs from the circumcircle by limiting the radius to (longest side)/2 for obtuse triangles, i.e., those with i^2 + j^2 < k^2.

			The list of radii of the n-th enclosing circle, rounded to 10^-4, starts: {0.57735, 1.0328, 1.1547, 1.5000, 1.5213, 1.5910, 1.7321, 2.0000, 2.0125, 2.0158, 2.0656, 2.1574, 2.3094, 2.5000, 2.5000, 2.5000, 2.5126, 2.5516, 2.5621, 2.6207, 2.7277, 2.8868, 3.0000, 3.0000, 3.0000, 3.0000, 3.0105, ...}.
a(1) = 1: 1 circle (R = 0.57735) with R <= 1,
a(2) = 8: a(1) + 7 circles (R = 1.0328, 1.1547, 1.5000, 1.5213, 1.5910, 1.7321, 2.0000) with 1 < R <= 2,
a(3) = 26: a(2) + 18 circles (R = 2.0125, 2.0158, 2.0656, 2.1574, 2.3094, 2.5000, 2.5000, 2.5000, 2.5126, 2.5516, 2.5621, 2.6207, 2.7277, 2.8868, 3.0000, 3.0000, 3.0000, 3.0000) with 2 < R <= 3.

Cf. A331229, A331240, A331243, A331244, A331245, A331246.

A331243 a(n) = number of triangles with integer sides i <= j <= k with diameter of enclosing circle <= n.

Original entry on oeis.org

0, 1, 4, 8, 16, 26, 39, 56, 79, 106, 138, 175, 221, 272, 331, 397, 471, 555, 648, 750

Offset: 1

Hugo Pfoertner, Jan 20 2020

The enclosing circle differs from the circumcircle by limiting the diameter to the longest side k for obtuse triangles, i.e., those with i^2 + j^2 < k^2.

			The sorted list of diameters D(n), rounded to 10^-4, starts: {1.1547, 2.0656, 2.3094, 3.0000, 3.0426, 3.1820, 3.4641, 4.0000, 4.0249, 4.0316, 4.1312, 4.3149, 4.6188, 5.0000, 5.0000, 5.0000, 5.0252, ...}.
a(1) = 0: 0 circles with D <= 1,
a(2) = 1: 1 circle (D = 1.1547) with 1 < D <= 2,
a(3) = 4: a(2) + 3 circles (D = 2.0656, 2.3094, 3.0000) with 2 < D <= 3,
a(4) = 8: a(3) + 4 circles (D = 3.04, 3.18, 3.46, 4.00) with 3 < D <= 4,
a(5) = 16: a(4) + 8 circles (D = 4.0249, ..., 5, 5, 5) with 4 < D <= 5.

Cf. A331229, A331240, A331242, A331244, A331245, A331246.

cp's OEIS Frontend

A331229 a(n) = number of triangles with integer sides i <= j <= k with radius of circumcircle <= n.

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A331242 a(n) = number of triangles with integer sides i <= j <= k with radius of enclosing circle <= n.

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A331243 a(n) = number of triangles with integer sides i <= j <= k with diameter of enclosing circle <= n.

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